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On Lie and Jordan structures associated with $(\epsilon,\delta)$-Freudenthal Kantor triple systems

Kamiya, Noriaki; Mondoc, Daniel LU and Okubo, Susumu (2010) In Mitteilungen der Mathematischen Gesellschaft in Hamburg 29. p.109-123
Abstract
In this paper we discuss the construction of $\delta$-Lie triple systems and associated Jordan structure from $(\epsilon,\delta)$-Freudenthal Kantor triple systems

and give examples of such triple systems, from which we can construct some Lie superalgebras.
Please use this url to cite or link to this publication:
author
organization
publishing date
type
Contribution to journal
publication status
published
subject
keywords
triple systems, Lie superalgebras
in
Mitteilungen der Mathematischen Gesellschaft in Hamburg
volume
29
pages
109 - 123
publisher
Halmstad University
language
English
LU publication?
yes
id
ac3c6ae0-c8d1-42fc-9383-d9f9c8ff2849 (old id 1670143)
alternative location
http://www.math.uni-hamburg.de/mathges/zeitschrift/index.html
date added to LUP
2010-11-19 13:13:39
date last changed
2016-04-16 09:00:18
@article{ac3c6ae0-c8d1-42fc-9383-d9f9c8ff2849,
  abstract     = {In this paper we discuss the construction of $\delta$-Lie triple systems and associated Jordan structure from $(\epsilon,\delta)$-Freudenthal Kantor triple systems<br/><br>
and give examples of such triple systems, from which we can construct some Lie superalgebras.},
  author       = {Kamiya, Noriaki and Mondoc, Daniel and Okubo, Susumu},
  keyword      = {triple systems,Lie superalgebras},
  language     = {eng},
  pages        = {109--123},
  publisher    = {Halmstad University},
  series       = {Mitteilungen der Mathematischen Gesellschaft in Hamburg},
  title        = {On Lie and Jordan structures associated with $(\epsilon,\delta)$-Freudenthal Kantor triple systems},
  volume       = {29},
  year         = {2010},
}